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Mathematical Treasure: John Craig’s Methodus and Tractatus

Author(s): 
Frank J. Swetz (The Pennsylvania State University)

John Craig (1663–1731) was a Scottish mathematician and theologian. He studied at Cambridge University under David Gregory, where he remained for much of his life. While a close associate of Isaac Newton, he was also the first man to introduce Leibnizian notation in England. Two of Craig’s most important works were Methodus figurarum lineis rectis et curvis comprehensarum quadraturas determinandi (A method of determining the quadrature of figures comprised in straight lines and curves, 1685) and Tractatus mathematicus de figurarum curvilinearum quadraturis et locis geometricis (A mathematical treatise on the quadrature of curvilinear figures and geometric areas, 1693). Below are some images from his Methodus:

Title page for John Craig's Methodus figurarum lineis rectis et curvis comprehensarum quadraturas determinandi (1685).

Page 1 from John Craig's Methodus figurarum lineis rectis et curvis comprehensarum quadraturas determinandi (1685).

Page 2 from John Craig's Methodus figurarum lineis rectis et curvis comprehensarum quadraturas determinandi (1685).

Page 3 from John Craig's Methodus figurarum lineis rectis et curvis comprehensarum quadraturas determinandi (1685).

The title page from Craig’s Tractatus:

Title page of John Craig's Tractatus mathematicus de figurarum curvilinearum quadraturis et locis geometricis (1693).

Craig dedicated the treatise to Gilbert Burnet (1643–1715), Bishop of Salisbury:

Dedication page for Craig's Tractatus mathematicus de figurarum curvilinearum quadraturis et locis geometricis, 1693.

Theorems related to quadrature:

Pages 26-27 from Craig's Tractatus mathematicus de figurarum curvilinearum quadraturis et locis geometricis, 1693.

Digitizations of Methodus and Tractatus are available from the Wellcome Library.

Index to Mathematical Treasures

Frank J. Swetz (The Pennsylvania State University), "Mathematical Treasure: John Craig’s Methodus and Tractatus," Convergence (July 2023)

Convergence
Tags: 
Calculus
Geometry
History of Mathematics